| Time Limit: 1000MS | Memory Limit: 10000K | |
| Total Submissions: 26782 | Accepted: 9598 |
Description
Given a connected undirected graph, tell if its minimum spanning tree is unique.
Definition 1 (Spanning Tree): Consider a connected, undirected graph G = (V, E). A spanning tree of G is a subgraph of G, say T = (V', E'), with the following properties:
1. V' = V.
2. T is connected and acyclic.
Definition 2 (Minimum Spanning Tree): Consider an edge-weighted, connected, undirected graph G = (V, E). The minimum spanning tree T = (V, E') of G is the spanning tree that has the smallest total cost. The total cost of T means the sum of the weights on all the edges in E'.
Definition 1 (Spanning Tree): Consider a connected, undirected graph G = (V, E). A spanning tree of G is a subgraph of G, say T = (V', E'), with the following properties:
1. V' = V.
2. T is connected and acyclic.
Definition 2 (Minimum Spanning Tree): Consider an edge-weighted, connected, undirected graph G = (V, E). The minimum spanning tree T = (V, E') of G is the spanning tree that has the smallest total cost. The total cost of T means the sum of the weights on all the edges in E'.
Input
The
first line contains a single integer t (1 <= t <= 20), the number
of test cases. Each case represents a graph. It begins with a line
containing two integers n and m (1 <= n <= 100), the number of
nodes and edges. Each of the following m lines contains a triple (xi,
yi, wi), indicating that xi and yi are connected by an edge with weight =
wi. For any two nodes, there is at most one edge connecting them.
Output
For each input, if the MST is unique, print the total cost of it, or otherwise print the string 'Not Unique!'.
Sample Input
2
3 3
1 2 1
2 3 2
3 1 3
4 4
1 2 2
2 3 2
3 4 2
4 1 2
Sample Output
3
Not Unique!
Source
先跑一遍最小生成树,把树上边都记录下来。
然后枚举不使用其中一条边而再跑最小生成树,若答案没变,说明最小生成树不止一条。
注意数组大小←至少有十道题死在这个问题上了
用n估算的话5000最保险,实际上3000可AC
1 #include<iostream> 2 #include<cstdio> 3 #include<cstring> 4 #include<algorithm> 5 #include<cmath> 6 using namespace std; 7 const int mxn=12000; 8 int n,m; 9 struct edge{ 10 int x,y; 11 int v; 12 }e[mxn]; 13 int tot; 14 int mst[mxn],cnt; 15 int cmp(const edge a,const edge b){ 16 return a.v<b.v; 17 } 18 int fa[mxn]; 19 void init(int x){ 20 for(int i=1;i<=x;i++)fa[i]=i;return; 21 } 22 int find(int x){ 23 if(fa[x]==x)return x; 24 return fa[x]=find(fa[x]); 25 } 26 void Kruskal(){ 27 28 init(n); 29 int i,j; 30 cnt=0; 31 int ans1=0; 32 tot=0; 33 for(i=1;i<=m;i++){ 34 int x=find(e[i].x);int y=find(e[i].y); 35 if(x!=y){ 36 fa[x]=y; 37 ans1+=e[i].v; 38 mst[++cnt]=i; 39 tot++; 40 } 41 if(tot==n-1)break; 42 } 43 // 44 int ans2; 45 for(int k=1;k<=cnt;k++){ 46 tot=0; ans2=0; 47 init(n); 48 //init 49 for(i=1;i<=m;i++){ 50 if(i==mst[k])continue; 51 int x=find(e[i].x);int y=find(e[i].y); 52 if(x!=y){ 53 fa[x]=y; 54 ans2+=e[i].v; 55 // mst[++cnt]=i;//!!这步不能加! 偷懒从上面复制的结果就是WA记录喜+1 56 tot++; 57 } 58 if((tot==n-1) && ans1==ans2){ 59 printf("Not Unique! "); 60 return; 61 } 62 } 63 } 64 printf("%d ",ans1); 65 return; 66 } 67 int main(){ 68 int T; 69 scanf("%d",&T); 70 while(T--){ 71 scanf("%d%d",&n,&m); 72 for(int i=1;i<=m;i++) 73 scanf("%d%d%d",&e[i].x,&e[i].y,&e[i].v); 74 sort(e+1,e+m+1,cmp); 75 Kruscal(); 76 } 77 return 0; 78 }